14414400

Appears in sequences

• a(n) is the minimal number of binary order n which has maximal number of divisors in this interval.at n=24A036484
• Largest number having binary order n (A029837) and of which the number of divisors is maximal in that range of g(k) = n.at n=24A036493
• Least k such that n*prime(k) <= k*tau(k).at n=26A073066
• Highly composite numbers k such that 2*k is not a highly composite number.at n=16A073771
• a(n)=[(n+1)(n+2)(n+3)...(2n)]/(1+2+3+...+n).at n=7A110371
• Least number k such that sigma(k) >= 2^n.at n=25A172516
• Numbers n such that both n and n/2 are highly composite (A002182).at n=29A181809
• Smallest k such that the partial sums of the divisors of k (in decreasing order) generate n primes.at n=33A187825
• List of highly composite numbers (A002182) with an exponent in its prime factorization that is at least as great as the number of positive exponents; intersection of A002182 and A212165.at n=26A212169
• Numbers n for which Delta(m) < Delta(n) for all m < n, where Delta is Hooley's Delta function A226898.at n=35A226899
• Positions of records in A220400.at n=40A297160
• Numbers k such that A095112(k)/k sets a new record.at n=37A307187
• Highly composite numbers that are a product of two highly composite numbers greater than 1.at n=33A307763
• Largely composite numbers (A067128) with a unique number of divisors.at n=17A308531
• Highly composite numbers (A002182) that are not superabundant numbers (A004394).at n=10A308913
• Highly composite numbers (A002182) that are not superior highly composite numbers (A002201).at n=36A333655
• Noninfinitary highly composite numbers: where the number of noninfinitary divisors (A348341) increases to a record.at n=38A348342
• Highly composite numbers that cease to be highly composite if divided by their largest prime factor.at n=14A352699
• a(1) = a(2) = 1; for n > 2, a(n) is the smallest positive number that has the same number of divisors as the sum a(n-2) + a(n-1).at n=46A355649
• Positions of records in A355770.at n=32A355772